Strong Whitney convergence on bornologies
Filomat, Tome 36 (2022) no. 7, p. 2427
Voir la notice de l'article provenant de la source eLibrary of Mathematical Institute of the Serbian Academy of Sciences and Arts
The strong Whitney convergence on bornology introduced by Caserta in [9] is a generalization of the strong uniform convergence on bornology introduced by Beer-Levi in [5]. This paper aims to study some important topological properties of the space of all real valued continuous functions on a metric space endowed with the topologies of Whitney and strong Whitney convergence on bornology. More precisely, we investigate metrizability, various countability properties, countable tightness, and Fréchet property of these spaces. In the process, we also present a new characterization for a bornology to be shielded from closed sets.
Classification :
54C35, 54A10, 54C05, 54C30, 54D70
Keywords: Bornology, continuous real functions, countability properties, Fréchet property, shield, strong Whitney convergence
Keywords: Bornology, continuous real functions, countability properties, Fréchet property, shield, strong Whitney convergence
Tarun Kumar Chauhan; Varun Jindal. Strong Whitney convergence on bornologies. Filomat, Tome 36 (2022) no. 7, p. 2427 . doi: 10.2298/FIL2207427C
@article{10_2298_FIL2207427C,
author = {Tarun Kumar Chauhan and Varun Jindal},
title = {Strong {Whitney} convergence on bornologies},
journal = {Filomat},
pages = {2427 },
year = {2022},
volume = {36},
number = {7},
doi = {10.2298/FIL2207427C},
language = {en},
url = {http://geodesic.mathdoc.fr/articles/10.2298/FIL2207427C/}
}
Cité par Sources :